Julio H. Toloza scite author profile

Resonance states of a two-electron quantum dots are studied using a variational expansion with both real basis-set functions and complex scaling methods. The two-electron entanglement (linear entropy) is calculated as a function of the electron repulsion at both sides of the critical value, where the ground (bound) state becomes a resonance (unbound) state. The linear entropy and fidelity and double orthogonality functions are compared as methods for the determination of the real part of the energy of a resonance. The complex linear entropy of a resonance state is introduced using complex scaling formalism.

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Applications of Krein's theory of regular symmetric operators to sampling theory

Silva¹,

Toloza²

2007

J. Phys. A: Math. Theor.

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The classical Kramer sampling theorem establishes general conditions that allow the reconstruction of functions by mean of orthogonal sampling formulae. One major task in sampling theory is to find concrete, non trivial realizations of this theorem. In this paper we provide a new approach to this subject on the basis of the M. G. Krein's theory of representation of simple regular symmetric operators having deficiency indices (1, 1). We show that the resulting sampling formulae have the form of Lagrange interpolation series. We also characterize the space of functions reconstructible by our sampling formulae. Our construction allows a rigorous treatment of certain ideas proposed recently in quantum gravity. * Mathematics Subject Classification(2000): 41A05, 46E22, 47B25, 47N50, 47N99, 94A20. †

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The class ofn-entire operators

Silva

Toloza

2012

J. Phys. A: Math. Theor.

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We introduce a classification of simple, regular, closed symmetric operators with deficiency indices (1, 1) according to a geometric criterion that extends the classical notions of entire operators and entire operators in the generalized sense due to M. G. Krein. We show that these classes of operators have several distinctive properties, some of them related to the spectra of their canonical selfadjoint extensions. In particular, we provide necessary and sufficient conditions on the spectra of two canonical selfadjoint extensions of an operator for it to belong to one of our classes. Our discussion is based on some recent results in the theory of de Branges spaces.Mathematics Subject Classification(2000): 46E22, 47A25, 47B25, 47N99.

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The Spectra of Selfadjoint Extensions of Entire Operators with Deficiency Indices (1,1)

Silva

Toloza

2012

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We give necessary and sufficient conditions for real sequences to be the spectra of selfadjoint extensions of an entire operator whose domain may be non-dense. For this spectral characterization we use de Branges space techniques and a generalization of Krein's functional model for simple, regular, closed, symmetric operators with deficiency indices (1,1). This is an extension of our previous work in which similar results were obtained for densely defined operators. Mathematics Subject Classification(2000): 46E22, 47A25, 47B25

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Julio H. Toloza

Entropy, fidelity, and double orthogonality for resonance states in two-electron quantum dots

Applications of Krein's theory of regular symmetric operators to sampling theory

The class ofn-entire operators

The Spectra of Selfadjoint Extensions of Entire Operators with Deficiency Indices (1,1)

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